Answer:
3/5
Explanation:
There are 6 possibilities for the number on the first card Mary draws. After this, there are 5 possibilities for the second card, because Mary can't draw the first card again. Thus, there are 6(5)=30 possibilities for the pair of cards.
Among these, there are 4(3) = 12 pairs that don't include at least one square number. To see why, consider that there are 4 choices for the first non-square number, then 3 choices for the second non-square number (since $1$ of the original $4$ choices has been used up).
Since 12 possible pairs don't include at least one square, the other 30-12=18 pairs do include at least one square. Therefore, the probability that Mary gets at least one square number is 18/30=3/5.